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On the (Δ + 2)-Total-Colorability of Planar Graphs with 7-Cycles Containing at Most Two Chords

On the (Δ + 2)-Total-Colorability of Planar Graphs with 7-Cycles Containing at Most Two Chords
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摘要 The Total Coloring Conjecture (TCC) proposes that every simple graph G is (Δ + 2)-totally-colorable, where Δ is the maximum degree of G. For planar graph, TCC is open only in case Δ = 6. In this paper, we prove that TCC holds for planar graph with Δ = 6 and every 7-cycle contains at most two chords. The Total Coloring Conjecture (TCC) proposes that every simple graph G is (Δ + 2)-totally-colorable, where Δ is the maximum degree of G. For planar graph, TCC is open only in case Δ = 6. In this paper, we prove that TCC holds for planar graph with Δ = 6 and every 7-cycle contains at most two chords.
作者 Jian Chang Jingru Liu Fan Zhang Jian Chang;Jingru Liu;Fan Zhang(College of Mathematics Science, Inner Mongolia Normal University, Hohhot, China;Laboratory of Infinite-Dimensional Hamiltonian System and Its Algorithm Application, Hohhot, China)
出处 《Journal of Applied Mathematics and Physics》 2024年第7期2702-2710,共9页 应用数学与应用物理(英文)
关键词 Planar Graph 7-Cycle 8-Totally-Colorable Maximum Degree Planar Graph 7-Cycle 8-Totally-Colorable Maximum Degree
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